Preasymptotic error estimates of EEM and CIP-EEM for the time-harmonic Maxwell equations with large wave number
Abstract
Preasymptotic error estimates are derived for the linear edge element method (EEM) and the linear H(curl)-conforming interior penalty edge element method (CIP-EEM) for the time-harmonic Maxwell equations with large wave number. It is shown that under the mesh condition that 3 h2 is sufficiently small, the errors of the solutions to both methods are bounded by O ( h + 3 h2 ) in the energy norm and O ( h2 + 2 h2 ) in the L2 norm, where is the wave number and h is the mesh size. Numerical tests are provided to verify our theoretical results and to illustrate the potential of CIP-EEM in significantly reducing the pollution effect.
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